Automorphisms of descending mod-p central series

Abstract

Given a free group of finite rank n and a prime number p, denote by k the kth layer of the Stallings (=S) or Zassenhaus (=Z) p-central series, by Nk the quotient /k+1 and by Lk the quotient k /k+1. In this paper we prove that there is a non-central extension of groups 0 Hom(N1, Lk+1) Aut\;Nk+1 Aut \;Nk 1, which splits if and only if k=1 and p is odd if =Z or, k=1 and (p,n)= (3,2), (2,2) if =S. Moreover, if we denote by IAp(Nk ) the subgroup of Aut \;Nk formed by the automorphisms that acts trivially on N1, then the restriction of this extension to IAp(Nk+1) give us a non-split central extension of groups 0 Hom(N1,Lk+1) IAp(Nk+1) IAp(Nk ) 1.